Here is another example of a fourfold, in the mathematics of Fourier Analysis. Here the four elements of our investigation resolve into **Discrete Time**, **Continuous Time**, the **Fourier Series**, and the **Fourier Transform**.

From the three dualities of **Time – Frequency**, **Periodic – Aperiodic**, and **Discrete – Continuous**, we obtain the four combinations *Discrete Time/Periodic Frequency*, *Continuous Time/Aperiodic Frequency*, the Fourier Series (*Periodic Time/Discrete Frequency*), and the Fourier Transform (*Aperiodic Time/Continuous Frequency*).

In the table below, T stands for Time and f for Frequency. The subscripts denote the attributes of each: D for Discrete, C for Continuous, P for Periodic, and A for Aperiodic. So T subscript C, f subscript A means that when Time is Continuous, Frequency is Aperiodic, etc. Please see Steve Tjoa’s web site for the equations for the Fourier Series and the Fourier Transform in Continuous and Discrete Time.References:

http://stevetjoa.com/633

http://en.wikipedia.org/wiki/Fourier_analysis

http://en.wikipedia.org/wiki/Fourier_series

http://en.wikipedia.org/wiki/Fourier_transform

[*7.74, *7.108]

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